Characteristic cohomology II: Matrix singularities

IF 0.8 2区 数学 Q2 MATHEMATICS Journal of Topology Pub Date : 2024-06-27 DOI:10.1112/topo.12330
James Damon
{"title":"Characteristic cohomology II: Matrix singularities","authors":"James Damon","doi":"10.1112/topo.12330","DOIUrl":null,"url":null,"abstract":"<p>For a germ of a variety <span></span><math>\n <semantics>\n <mrow>\n <mi>V</mi>\n <mo>,</mo>\n <mn>0</mn>\n <mo>⊂</mo>\n <msup>\n <mi>C</mi>\n <mi>N</mi>\n </msup>\n <mo>,</mo>\n <mn>0</mn>\n </mrow>\n <annotation>$\\mathcal {V}, 0 \\subset \\mathbb {C}^N, 0$</annotation>\n </semantics></math>, a singularity <span></span><math>\n <semantics>\n <msub>\n <mi>V</mi>\n <mn>0</mn>\n </msub>\n <annotation>$\\mathcal {V}_0$</annotation>\n </semantics></math> of “type <span></span><math>\n <semantics>\n <mi>V</mi>\n <annotation>$\\mathcal {V}$</annotation>\n </semantics></math>”  is given by a germ <span></span><math>\n <semantics>\n <mrow>\n <msub>\n <mi>f</mi>\n <mn>0</mn>\n </msub>\n <mo>:</mo>\n <msup>\n <mi>C</mi>\n <mi>n</mi>\n </msup>\n <mo>,</mo>\n <mn>0</mn>\n <mo>→</mo>\n <msup>\n <mi>C</mi>\n <mi>N</mi>\n </msup>\n <mo>,</mo>\n <mn>0</mn>\n </mrow>\n <annotation>$f_0: \\mathbb {C}^n, 0 \\rightarrow \\mathbb {C}^N, 0$</annotation>\n </semantics></math>, which is transverse to <span></span><math>\n <semantics>\n <mrow>\n <mi>V</mi>\n <mo>∖</mo>\n <mo>{</mo>\n <mn>0</mn>\n <mo>}</mo>\n </mrow>\n <annotation>$\\mathcal {V}\\setminus \\lbrace 0\\rbrace$</annotation>\n </semantics></math> in an appropriate sense, such that <span></span><math>\n <semantics>\n <mrow>\n <msub>\n <mi>V</mi>\n <mn>0</mn>\n </msub>\n <mo>=</mo>\n <msubsup>\n <mi>f</mi>\n <mn>0</mn>\n <mrow>\n <mo>−</mo>\n <mn>1</mn>\n </mrow>\n </msubsup>\n <mrow>\n <mo>(</mo>\n <mi>V</mi>\n <mo>)</mo>\n </mrow>\n </mrow>\n <annotation>$\\mathcal {V}_0 = f_0^{-1}(\\mathcal {V})$</annotation>\n </semantics></math>. In part I of this paper, we introduced for such singularities the Characteristic Cohomology for the Milnor fiber (for <span></span><math>\n <semantics>\n <mi>V</mi>\n <annotation>$\\mathcal {V}$</annotation>\n </semantics></math> a hypersurface), and complement and link (for the general case). It captures the cohomology of <span></span><math>\n <semantics>\n <msub>\n <mi>V</mi>\n <mn>0</mn>\n </msub>\n <annotation>$\\mathcal {V}_0$</annotation>\n </semantics></math> inherited from <span></span><math>\n <semantics>\n <mi>V</mi>\n <annotation>$\\mathcal {V}$</annotation>\n </semantics></math> and is given by subalgebras of the cohomology for <span></span><math>\n <semantics>\n <msub>\n <mi>V</mi>\n <mn>0</mn>\n </msub>\n <annotation>$\\mathcal {V}_0$</annotation>\n </semantics></math> for the Milnor fiber and complements, and is a subgroup for the cohomology of the link. We showed these cohomologies are functorial and invariant under diffeomorphism groups of equivalences <span></span><math>\n <semantics>\n <msub>\n <mi>K</mi>\n <mi>H</mi>\n </msub>\n <annotation>$\\mathcal {K}_{H}$</annotation>\n </semantics></math> for Milnor fibers and <span></span><math>\n <semantics>\n <msub>\n <mi>K</mi>\n <mi>V</mi>\n </msub>\n <annotation>$\\mathcal {K}_{\\mathcal {V}}$</annotation>\n </semantics></math> for complements and links. We also gave geometric criteria for detecting the nonvanishing of the characteristic cohomology.</p><p>In this paper, we apply these methods in the case <span></span><math>\n <semantics>\n <mi>V</mi>\n <annotation>$\\mathcal {V}$</annotation>\n </semantics></math> denotes any of the varieties of singular <span></span><math>\n <semantics>\n <mrow>\n <mi>m</mi>\n <mo>×</mo>\n <mi>m</mi>\n </mrow>\n <annotation>$m \\times m$</annotation>\n </semantics></math> complex matrices, which may be either general, symmetric, or skew-symmetric (with <span></span><math>\n <semantics>\n <mi>m</mi>\n <annotation>$m$</annotation>\n </semantics></math> even). For these varieties, we have shown in another paper that their Milnor fibers and complements have compact “model submanifolds”  for their homotopy types, which are classical symmetric spaces in the sense of Cartan. As a result, we first give the structure of the characteristic cohomology subalgebras for the Milnor fibers and complements as images of exterior algebras (or in one case a module on two generators over an exterior algebra). For links, the characteristic cohomology group is the image of a shifted upper truncated exterior algebra. In addition, we extend these results for the complement and link to the case of general <span></span><math>\n <semantics>\n <mrow>\n <mi>m</mi>\n <mo>×</mo>\n <mi>p</mi>\n </mrow>\n <annotation>$m \\times p$</annotation>\n </semantics></math> complex matrices.</p><p>Second, we then apply the geometric detection methods introduced in Part I to detect when specific characteristic cohomology classes for the Milnor fiber or complement are nonzero. We identify an exterior subalgebra on a specific set of generators and for the link that it contains an appropriate shifted upper truncated exterior subalgebra. The detection criterion involves a special type of “kite map germ of size <span></span><math>\n <semantics>\n <mi>ℓ</mi>\n <annotation>$\\ell$</annotation>\n </semantics></math>” based on a given flag of subspaces. The general criterion that detects such nonvanishing characteristic cohomology is then given in terms of the defining germ <span></span><math>\n <semantics>\n <msub>\n <mi>f</mi>\n <mn>0</mn>\n </msub>\n <annotation>$f_0$</annotation>\n </semantics></math> containing such a kite map germ of size <span></span><math>\n <semantics>\n <mi>ℓ</mi>\n <annotation>$\\ell$</annotation>\n </semantics></math>. Furthermore, we use a restricted form of kite spaces to give a cohomological relation between the cohomology of local links and the global link for the varieties of singular matrices.</p>","PeriodicalId":56114,"journal":{"name":"Journal of Topology","volume":"17 3","pages":""},"PeriodicalIF":0.8000,"publicationDate":"2024-06-27","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"0","resultStr":null,"platform":"Semanticscholar","paperid":null,"PeriodicalName":"Journal of Topology","FirstCategoryId":"100","ListUrlMain":"https://onlinelibrary.wiley.com/doi/10.1112/topo.12330","RegionNum":2,"RegionCategory":"数学","ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"Q2","JCRName":"MATHEMATICS","Score":null,"Total":0}
引用次数: 0

Abstract

For a germ of a variety V , 0 C N , 0 $\mathcal {V}, 0 \subset \mathbb {C}^N, 0$ , a singularity V 0 $\mathcal {V}_0$ of “type V $\mathcal {V}$ ”  is given by a germ f 0 : C n , 0 C N , 0 $f_0: \mathbb {C}^n, 0 \rightarrow \mathbb {C}^N, 0$ , which is transverse to V { 0 } $\mathcal {V}\setminus \lbrace 0\rbrace$ in an appropriate sense, such that V 0 = f 0 1 ( V ) $\mathcal {V}_0 = f_0^{-1}(\mathcal {V})$ . In part I of this paper, we introduced for such singularities the Characteristic Cohomology for the Milnor fiber (for V $\mathcal {V}$ a hypersurface), and complement and link (for the general case). It captures the cohomology of V 0 $\mathcal {V}_0$ inherited from V $\mathcal {V}$ and is given by subalgebras of the cohomology for V 0 $\mathcal {V}_0$ for the Milnor fiber and complements, and is a subgroup for the cohomology of the link. We showed these cohomologies are functorial and invariant under diffeomorphism groups of equivalences K H $\mathcal {K}_{H}$ for Milnor fibers and K V $\mathcal {K}_{\mathcal {V}}$ for complements and links. We also gave geometric criteria for detecting the nonvanishing of the characteristic cohomology.

In this paper, we apply these methods in the case V $\mathcal {V}$ denotes any of the varieties of singular m × m $m \times m$ complex matrices, which may be either general, symmetric, or skew-symmetric (with m $m$ even). For these varieties, we have shown in another paper that their Milnor fibers and complements have compact “model submanifolds”  for their homotopy types, which are classical symmetric spaces in the sense of Cartan. As a result, we first give the structure of the characteristic cohomology subalgebras for the Milnor fibers and complements as images of exterior algebras (or in one case a module on two generators over an exterior algebra). For links, the characteristic cohomology group is the image of a shifted upper truncated exterior algebra. In addition, we extend these results for the complement and link to the case of general m × p $m \times p$ complex matrices.

Second, we then apply the geometric detection methods introduced in Part I to detect when specific characteristic cohomology classes for the Milnor fiber or complement are nonzero. We identify an exterior subalgebra on a specific set of generators and for the link that it contains an appropriate shifted upper truncated exterior subalgebra. The detection criterion involves a special type of “kite map germ of size $\ell$ ” based on a given flag of subspaces. The general criterion that detects such nonvanishing characteristic cohomology is then given in terms of the defining germ f 0 $f_0$ containing such a kite map germ of size $\ell$ . Furthermore, we use a restricted form of kite spaces to give a cohomological relation between the cohomology of local links and the global link for the varieties of singular matrices.

查看原文
分享 分享
微信好友 朋友圈 QQ好友 复制链接
本刊更多论文
特性同调 II:矩阵奇点
对于 "类型 V $\mathcal {V}$"的一个综类 V 0 $\mathcal {V}_0$ 是由一个综类 f 0 : C n , 0 → C N , 0 $f_0: \mathbb {C}^n, 0 \rightarrow \mathbb {C}^N, 0$ 给出的,它横向于 V ∖ { 0 }。 $\mathcal {V}setminus \lbrace 0\rbrace$ 在适当的意义上,这样 V 0 = f 0 - 1 ( V ) $\mathcal {V}_0 = f_0^{-1}(\mathcal {V})$ 。在本文的第一部分,我们介绍了这种奇点的米尔诺纤维(对于 V $\mathcal {V}$ 一个超曲面)的特性同调(Characteristic Cohomology),以及补集和链接(对于一般情况)。它捕捉了从 V $\mathcal {V}$ 继承而来的 V 0 $\mathcal {V}_0$ 的同调,并由米尔诺纤维和补集的 V 0 $\mathcal {V}_0$ 的同调的子代数给出,而且是链接的同调的子群。我们证明了这些同调在米尔诺纤维的等价衍射组 K H $\mathcal {K}_{H}$和补集与链接的等价衍射组 K V $\mathcal {K}_{\mathcal {V}}$下是函数式的和不变的。在本文中,我们将这些方法应用于 V $\mathcal {V}$ 表示奇异 m × m $m \times m$ 复矩阵的任何品种的情况,这些复矩阵可能是一般的、对称的或倾斜对称的(m $m$ 偶数)。对于这些矩阵,我们在另一篇论文中已经证明,它们的米尔诺纤维和补集有紧凑的 "模型子 afternoon",它们的同调类型是 Cartan 意义上的经典对称空间。因此,我们首先给出了米尔诺纤维和补集的特征同调子代数的结构,即外部代数的图像(或者在一种情况下,外部代数上两个生成器的模块)。对于链接,特征同调群是移位上截外部代数的映像。此外,我们将这些关于补集和链接的结果扩展到一般 m × p $m \times p$ 复矩阵的情况。其次,我们应用第一部分介绍的几何检测方法来检测米尔诺纤维或补集的特定特征同调类何时为非零。我们在一组特定的生成器上识别出一个外部子代数,并确定它包含一个适当的移位上截断外部子代数。检测标准涉及一种基于给定子空间标志的特殊类型 "大小为 ℓ $\ell$ 的风筝映射胚芽"。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
求助全文
约1分钟内获得全文 去求助
来源期刊
Journal of Topology
Journal of Topology 数学-数学
CiteScore
2.00
自引率
9.10%
发文量
62
审稿时长
>12 weeks
期刊介绍: The Journal of Topology publishes papers of high quality and significance in topology, geometry and adjacent areas of mathematics. Interesting, important and often unexpected links connect topology and geometry with many other parts of mathematics, and the editors welcome submissions on exciting new advances concerning such links, as well as those in the core subject areas of the journal. The Journal of Topology was founded in 2008. It is published quarterly with articles published individually online prior to appearing in a printed issue.
期刊最新文献
Chow–Witt rings and topology of flag varieties Recalibrating R $\mathbb {R}$ -order trees and Homeo + ( S 1 ) $\mbox{Homeo}_+(S^1)$ -representations of link groups Equivariant algebraic concordance of strongly invertible knots Metrics of positive Ricci curvature on simply-connected manifolds of dimension 6 k $6k$ On the equivalence of Lurie's ∞ $\infty$ -operads and dendroidal ∞ $\infty$ -operads
×
引用
GB/T 7714-2015
复制
MLA
复制
APA
复制
导出至
BibTeX EndNote RefMan NoteFirst NoteExpress
×
×
提示
您的信息不完整,为了账户安全,请先补充。
现在去补充
×
提示
您因"违规操作"
具体请查看互助需知
我知道了
×
提示
现在去查看 取消
×
提示
确定
0
微信
客服QQ
Book学术公众号 扫码关注我们
反馈
×
意见反馈
请填写您的意见或建议
请填写您的手机或邮箱
已复制链接
已复制链接
快去分享给好友吧!
我知道了
×
扫码分享
扫码分享
Book学术官方微信
Book学术文献互助
Book学术文献互助群
群 号:481959085
Book学术
文献互助 智能选刊 最新文献 互助须知 联系我们:info@booksci.cn
Book学术提供免费学术资源搜索服务,方便国内外学者检索中英文文献。致力于提供最便捷和优质的服务体验。
Copyright © 2023 Book学术 All rights reserved.
ghs 京公网安备 11010802042870号 京ICP备2023020795号-1